Question

An irrational number between 3 and 5 is - *

√3+√5

√(3×5)

(3+5)/2

(5-3)/2

​

Answer 1

Answer:

2nd option is correct

Step-by-step explanation:

May this answer helps you more

Answer 2

Answer:

Rational numbers as well as irrational numbers are so dense that between any two given real numbers there are infinitely many rational and irrational numbers.

An irrational number is a non-recurring non-terminating decimal.

So between 3 and 5 we can write 4.769382546043….., 3.5036184639……. etc.,

or we have our own π= 3.14159265358979………,

or 3e/2= 4.07742274268856……..

You too can write on your own many irrational numbers between 3 and 5.

u think q must be irrational no. between root 3 and root 5 then ans for it

How do you find two irrational numbers between √5 & √3?

We know that there are infinite rational and irrational numbers between two rational or two irrational numbers.

5–√ & 3–√ are irrational number because

5–√=2.23606798…

3–√=1.73205081…

which are non- terminating and non- repeating decimal.

Hence, there is an infinite number between 2.23606798… & 1.73205081…

We can write any number of times different irrational number between them,

such as 2.12145389… or 2.04056428… or 1.88256943… or several numbers

and these are non- terminating & non-repeating decimals.